CILINDRO DE VOLUMEN MÁXIMO INSCRITO EN ESFERA DE RADIO R. Optimización. Cálculo Diferencial.
Optimization problem in which we find the dimensions of a cylinder of maximum volume inscribed in a sphere with a radius of 8 cm. Collection of exercises on differential calculus applications: • Aplicaciones de las derivadas Link to the "X-ray glasses for graphing" https://amzn.to/4gxzvN2 Lesson Contents Introduction 00:01 Volume of the Cylinder 1:14 Restrictive Condition 2:19 Meaning of the Zero Derivative 4:48 Obtaining the Critical Point 8:19 Second Derivative Criterion 12:32 Final Result 17:10 #differentialcalculus #matematicasconjuan #optimization Additional Information on Differential Calculus https://matematicasconjuan.com/calcul... Other classes that may interest you Interesting • CONO DE VOLUMEN MÍNIMO CIRCUNSCRITO A UNA ... • EL FAMOSO PROBLEMA DE LA ESCALERA. Cálculo... • PERÍMETRO MÍNIMO DE UN RECTÁNGULO. Aplicac... • RECTÁNGULO CON MAYOR ÁREA INSCRITO EN TRIÁ...

MINIMUM SURFACE AREA OF A BOX GIVEN THE CAPACITY. Optimization. Differential Calculus

CONO DE VOLUMEN MÍNIMO CIRCUNSCRITO A UNA ESFERA DE 8 cm DE RADIO. Cálculo Diferencial. Optimización

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